Birkhoff conjecture for nearly centrally symmetric domains
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Publication:6647782
DOI10.1007/S00039-024-00695-6MaRDI QIDQ6647782
K. Zhang, Vadim Kaloshin, Comlan E. Koudjinan
Publication date: 3 December 2024
Published in: Geometric and Functional Analysis. GAFA (Search for Journal in Brave)
Dynamical aspects of finite-dimensional Hamiltonian and Lagrangian systems (37Jxx) Hamiltonian and Lagrangian mechanics (70Hxx) Dynamical systems with hyperbolic behavior (37Dxx)
Cites Work
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- An integrable deformation of an ellipse of small eccentricity is an ellipse
- Angular billiard and algebraic Birkhoff conjecture
- Existence of \(C^{1,1}\) critical subsolutions in discrete weak KAM theory
- Convex billiards and a theorem by E. Hopf
- Surface transformations and their dynamical applications.
- Proof of Poincaré's geometric theorem.
- On the local Birkhoff conjecture for convex billiards
- Nearly circular domains which are integrable close to the boundary are ellipses
- The principle of least action in geometry and dynamics
- One can hear the shape of ellipses of small eccentricity
- The Birkhoff-Poritsky conjecture for centrally-symmetric billiard tables
- Tonelli Hamiltonians without conjugate points and \(C^0\) integrability
- Symplectic twist maps. Global variational techniques
- Billiard dynamics: An updated survey with the emphasis on open problems
- Convex Hamiltonians without conjugate points
- Strange Billiard Tables
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